. (a) Let f: X→ Y and g: Y→ Z be functions. Show that go f: X→ Z is a function too. (b) If f: X→ Y and g: Y→ Z are one-to-one functions, is gof one-to-one? (c) If f: X→ Y and g: Y→ Z are functions and g of is one-to-one, must g be one- to-one? Prove or give a counterexample. (d) If f:X→Y and g: Y→ Z are functions and go f is onto, must g be onto? Prove or give a counterexample.

. (a) Let f: X→ Y and g: Y→ Z be functions. Show that go f: X→ Z is a function too. (b) If f: X→ Y and g: Y→ Z are one-to-one functions, is gof one-to-one? (c) If f: X→ Y and g: Y→ Z are functions and g of is one-to-one, must g be one- to-one? Prove or give a counterexample. (d) If f:X→Y and g: Y→ Z are functions and go f is onto, must g be onto? Prove or give a counterexample.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter5: Inverse, Exponential, And Logarithmic Functions

Section5.3: The Natural Exponential Function

Problem 51E

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Question

Please send me answer within 10 min!! I will rate you good for sure! Please send me typed answer!

. (a) Let f:X → Y and g: Y→ Z be functions. Show that go f: X→ Z is a function too.
(b) If f: X→ Y and
g: Y→ Z are one-to-one functions, is g of one-to-one?
(c) If f: X→ Y and g: Y→ Z are functions and g of is one-to-one, must g be one-
to-one? Prove or give a counterexample.
(d) If f:X→Y and g: Y→ Z are functions and go f is onto, must g be onto? Prove
or give a counterexample.

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